\section{Hypotheses}

In this experiment, there are two test groups; one with the rules (group \textbf{A}), and one without the rules (group \textbf{B}).

The following two hypotheses have been derived from the problem statement: 

Null hypothesis 1 (H01): \textbf{A} understands the rules at least as good as \textbf{B}.\\
Alternative hypothesis 1 (HA1): \textbf{B} understands the rules better than \textbf{A}.

Null hypothesis 2 (H02): \textbf{A} enjoys the game as much as \textbf{B}.\\
Alternative hypothesis 2 (HA2): \textbf{A} enjoys the game more or less than \textbf{B}.

%A = Players who are not told the rule.
%B = Players who are told the rule in the beginning.
%u = Understanding
%e = Enjoyment
%
%Null-Hypothesis 1:
%B understands the rule at least as good as A.
%
%Alternative-Hypothesis 1:
%	if (Au > Bu) = A understands the rule better than B.
%	else = We can’t reject the null hypothesis.
%
%Null-Hypothesis 2:
%	A enjoys the game as much as B.
%
%Alternative-Hypothesis 2:
%	if (Ae > Be) = A enjoys the game more than B.
%	if (Ae < Be) = A enjoys the game less than B.
%	else = We can’t reject the null-hypothesis.
%	
%u is calculated by comparing the following:
%The combined average rating of their explanations of how they solved the puzzles.
%The average points given in the comprehension test.
%How accurate the average formulation of the rule was. 
%
%e is calculated by comparing the following:
%The combined average enjoyment score. 
%The average total rating of the game.
